Phase transitions on non-uniformly curved surfaces: coupling between phase and location

Abstract: For particles confined to two dimensions, any curvature of the surface affects the structural, kinetic and thermodynamic properties of the system. If the curvature is non-uniform, an even richer range...

“…1b. Standard Monte Carlo (MC) simulations based on the canonical ensemble (NVT simulations) on a sphere of radius R have been carried out using the generalized Metropolis algorithm 45,46 as follows. An initial random distribution of particles on the sphere is generated.…”

“…We construct the vector t = dv ˆ+ r ˆ(i) and normalize it to obtain the trial orientation vector 45 that is then accepted or rejected using the generalized Metropolis algorithm. 46 The scale factor d is initially set to d = 0.2 and optimized by updating it such that the acceptance probability is maintained at around 50%. We have used s 0 and e as the length and energy units, respectively, set l = 2, and studied the pattern formation dependence on R* R/s 0 , reduced temperature T* k B T/e, where k B is the Boltzmann's constant; and the number of particles N. The structural diversity and phase behavior is explored in detail for a small number of particles N r 12 although runs with other values of N are considered, with the largest value N = 400 as an example of a large system.…”

Packing core–corona particles on a spherical surface

“…1b. Standard Monte Carlo (MC) simulations based on the canonical ensemble (NVT simulations) on a sphere of radius R have been carried out using the generalized Metropolis algorithm 45,46 as follows. An initial random distribution of particles on the sphere is generated.…”

“…We construct the vector t = dv ˆ+ r ˆ(i) and normalize it to obtain the trial orientation vector 45 that is then accepted or rejected using the generalized Metropolis algorithm. 46 The scale factor d is initially set to d = 0.2 and optimized by updating it such that the acceptance probability is maintained at around 50%. We have used s 0 and e as the length and energy units, respectively, set l = 2, and studied the pattern formation dependence on R* R/s 0 , reduced temperature T* k B T/e, where k B is the Boltzmann's constant; and the number of particles N. The structural diversity and phase behavior is explored in detail for a small number of particles N r 12 although runs with other values of N are considered, with the largest value N = 400 as an example of a large system.…”

Packing core–corona particles on a spherical surface

“…ii) In our model the order parameter field is not coupled to any extrinsic or mean curvature terms in Equation 8. Such a coupling exists more or less prominently in various systems, from interactions through the bulk phase between hexatically arranged spheres [29] to the prominently mean-curvature-inducing properties of ordered domains of inclusions [30]. The focus on extrinsic curvature coupling has allowed us to study a field theory with unbroken continuous O n symmetry and the associated vortex state.…”

Effects of orientational order on modulated cylindrical interfaces

“…25 Curvature driven dynamics also play an important role in different biological processes [26][27][28] as well as in different properties of colloidal systems. [29][30][31] Three dimensional uniaxial nematics are orientationally ordered fluids, and can be characterized by the three component unit director n ˆ= (n x (x,y,z),n y (x,y,z),n z (x,y,z)), whereas the unit director of two dimensional a Centre for Condensed Matter Theory, Department of Physics, Indian Institute of nematics in a plane has two components: n ˆ= (n x (x,y),n y (x,y)). On a curved surface such as a sphere, the two dimensional nematic director lies in the local tangent plane to the sphere.…”

Packing and emergence of the ordering of rods in a spherical monolayer